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Displaying 141 – 153 of 153

Groups in the category of f-manifolds

Richard Millman (1975)

Fundamenta Mathematicae

Groups of $C^{r, s}$ -diffeomorphisms related to a foliation

Jacek Lech, Tomasz Rybicki (2007)

Banach Center Publications

The notion of a $C^{r, s}$ -diffeomorphism related to a foliation is introduced. A perfectness theorem for the group of $C^{r, s}$ -diffeomorphisms is proved. A remark on $C^{n + 1}$ -diffeomorphisms is given.

Groups of piecewise linear homeomorphisms of the real line.

Matthew G. Brin, Craig C. Squier (1985)

Inventiones mathematicae

Groups of real analytic diffeomorphisms of the circle with a finite image under the rotation number function

Yoshifumi Matsuda (2009)

Annales de l’institut Fourier

We consider groups of orientation-preserving real analytic diffeomorphisms of the circle which have a finite image under the rotation number function. We show that if such a group is nondiscrete with respect to the $C^{1}$ -topology then it has a finite orbit. As a corollary, we show that if such a group has no finite orbit then each of its subgroups contains either a cyclic subgroup of finite index or a nonabelian free subgroup.

Groups of transformations of a G-structure whic H leave invariant a substructure.

A.M. Amores (1982)

Collectanea Mathematica

Groups with Domains of Discontinuity.

S.R. Kulkarni (1978)

Mathematische Annalen

Groups with no infinite perfect subgroups and aspherical 2-complexes.

Michael N. Dyer (1993)

Commentarii mathematici Helvetici

Group-theoretic conditions under which closed aspherical manifolds are covered by Euclidean space

Hanspeter Fischer, David G. Wright (2003)

Fundamenta Mathematicae

Hass, Rubinstein, and Scott showed that every closed aspherical (irreducible) 3-manifold whose fundamental group contains the fundamental group of a closed aspherical surface, is covered by Euclidean space. This theorem does not generalize to higher dimensions. However, we provide geometric tools with which variations of this theorem can be proved in all dimensions.

Growth functions of surface groups.

J.W. Cannon, Ph. Wagreich (1992)

Mathematische Annalen

Growth functions on Fuchsian groups and the Euler characteristic.

S.P. Plotnick, W.J. Floyd (1987)

Inventiones mathematicae

Growth of a primitive of a differential form

Jean-Claude Sikorav (2001)

Bulletin de la Société Mathématique de France

For an exact differential form on a Riemannian manifold to have a primitive bounded by a given function $f$ , by Stokes it has to satisfy some weighted isoperimetric inequality. We show the converse up to some constants if $M$ has bounded geometry. For a volume form, it suffices to have the inequality ( $| Ω | \leq \int_{\partial Ω} f d σ$ for every compact domain $Ω \subset M$ ). This implies in particular the “well-known” result that if $M$ is the universal covering of a compact Riemannian manifold with non-amenable fundamental group, then the volume...

Growth of Jacobi Fields and Divergence of Geodesics.

J.-H. Eschenburg, J.J. O'Sullivan (1976)

Mathematische Zeitschrift

Growth of leaves.

John Cantwell, Lawrence Conlon (1978)

Commentarii mathematici Helvetici

Displaying 141 – 153 of 153

Currently displaying 141 – 153 of 153